On spectral sequence for the action of genus 3 Torelli group on the complex of cycles

Abstract

The Torelli group of a genus g oriented surface Sg is the subgroup Ig of the mapping class group Mod(Sg) consisting of all mapping classes that act trivially on the homology of Sg. One of the most intriguing open problems concerning Torelli groups is the question of whether the group I3 is finitely presented or not. A possible approach to this problem relies upon the study of the second homology group of I3 using the spectral sequence Erp,q for the action of I3 on the complex of cycles. In this paper we obtain a partial result towards the conjecture that H2(I3;Z) is not finitely generated and hence I3 is not finitely presented. Namely, we prove that the term E30,2 of the spectral sequence is infinitely generated, that is, the group E10,2 remains infinitely generated after taking quotients by images of the differentials d1 and d2. If one proceeded with the proof that it also remains infinitely generated after taking quotient by the image of d3, he would complete the proof of the fact that I3 is not finitely presented.